Problem Description
A ring is
compose of n circles as shown in diagram. Put natural number 1, 2,
..., n into each circle separately, and the sum of numbers in two
adjacent circles should be a prime.
Note: the number of first circle should always be 1.
Note: the number of first circle should always be 1.
Input
n (0 < n
< 20).
Output
The output
format is shown as sample below. Each row represents a series of
circle numbers in the ring beginning from 1 clockwisely and
anticlockwisely. The order of numbers must satisfy the above
requirements. Print solutions in lexicographical order.
You are to write a program that completes above process.
Print a blank line after each case.
You are to write a program that completes above process.
Print a blank line after each case.
Sample Input
6
8
Sample Output
Case
1:
1 4 3 2 5
6
1 6 5 2 3
4
Case
2:
1 2 3 8 5 6
7 4
1 2 5 8 3 4
7 6
1 4 7 6 5 8
3 2
1 6 7 4 3 8
5 2
题意:给你一个n,得到一个数组,1~n;让你写出一个素数环,要求相邻两个数(顺逆时针)和是素数,输出的时候第一个永远是一;
解题思路:按照递归求全排列的思想,从第2个开始递归一直到最后一位,并且首尾也是素数才算是搜索完成;
感悟:一开始我还以为得剪纸,但是只有20个数,一次就过了;
代码:
#include
#include
#include
#include
#define maxn 25
using namespace std;
int ans[maxn],visit[maxn],n;
int Prime(int a)
{
for(int
i=2;i<=sqrt(a);i++)
if(a%i==0)
return 0;
return
1;
}
void dfs(int cur)
{
if(cur==n&&Prime(ans[0]+ans[n-1]))//递归到最后一位,并且首尾也能是素数
{
for(int i=0;i
printf("%d ",ans[i]);
printf("%d
",ans[n-1]);
}
else
{
for(int i=2;i<=n;i++)
{
if(!visit[i]&&Prime(i+ans[cur-1]))//这个数没用过并且相邻的是素数
{
ans[cur]=i;
visit[i]=1;
dfs(cur+1);
visit[i]=0;
}
}
}
}
int main()
{
//freopen("in.txt", "r", stdin);
int
s=1;
memset(visit,0,sizeof(visit));
while(~scanf("%d",&n)&&n)
{
for(int i=0;i
ans[i]=i+1;
printf("Case %d:
",s++);
dfs(1);
printf("
");
}
}
#include
#include
#include
#define maxn 25
using namespace std;
int ans[maxn],visit[maxn],n;
int Prime(int a)
{
}
void dfs(int cur)
{
}
int main()
{
}